The equation `|z-i|=|x-1|, i=sqrt(-1)`, represents :

The equation |z-i|=|z-1|,i=sqrt(-1) represents:

The equation |z-i|=|z-1|,i= sqrt(-1) represents

Q.2 The equation |z+1-i|=|z+i-1| represents a

The equation z^(2)-i|z-1|^(2)=0, where i=sqrt(-1), has.

If the equation |z-z_1|^2 + |z-z_2|^2 =k , represents the equation of a circle, where z_1 = 3i, z_2 = 4+3i are the extremities of a diameter, then the value of k is

The equation |z - i| = |z - 1| represents :

Let z in C, the set of complex numbers. Thenthe equation,2|z+3i|-|z-i|=0 represents :

Which of the following is/are CORRECT . A) If one root of the equation x^(2)-sqrt(5)x-19=0 is (9-sqrt(5))/(2) ,then the other root is (-9+sqrt(5))/(2) B) If one root of the equation x^(2)-sqrt(5)x-19=0 is (9-sqrt(5))/(2) ,then the other root is (9+sqrt(5))/(2) C) If one root of the equation x^(2)-ix-(1+i)=0 , (i=sqrt(-1)) is 1+i find the other root -1 D) If one root of the equation x^(2)-ix-(1+i)=0 , (i=sqrt(-1)) is 1+i find the other root 1-i

Solve the equation |z|=z+1+2i

Solve the equation |z|=z+1+2i